| Birth Date: | c. 1380 |
| Birth Place: | Tirur, Cochin Kingdom |
| Death Date: | c. |
| Known For: | Mean value theorem Drig system Circumradius formula |
| Notable Works: | Drgganita Goladipika Grahanamandana |
| Occupation: | Astronomer-mathematician |
Vatasseri Parameshvara Nambudiri (1380–1460)[1] was a major Indian mathematician and astronomer of the Kerala school of astronomy and mathematics founded by Madhava of Sangamagrama. He was also an astrologer. Parameshvara was a proponent of observational astronomy in medieval India and he himself had made a series of eclipse observations to verify the accuracy of the computational methods then in use. Based on his eclipse observations, Parameshvara proposed several corrections to the astronomical parameters which had been in use since the times of Aryabhata. The computational scheme based on the revised set of parameters has come to be known as the Drgganita or Drig system. Parameshvara was also a prolific writer on matters relating to astronomy. At least 25 manuscripts have been identified as being authored by Parameshvara.[1]
Parameshvara was a Hindu of Bhrgugotra following the Ashvalayanasutra of the Rigveda. Parameshvara's family name (Illam) was Vatasseri and his family resided in the village of Alathiyur (Sanskritised as Asvatthagrama) in Tirur, Kerala. Alathiyur is situated on the northern bank of the river Nila (river Bharathappuzha) at its mouth in Kerala. He was a grandson of a disciple of Govinda Bhattathiri (1237–1295 CE), a legendary figure in the astrological traditions of Kerala.
Parameshvara studied under teachers Rudra and Narayana, and also under Madhava of Sangamagrama (c. 1350 – c. 1425) the founder of the Kerala school of astronomy and mathematics. Damodara, another prominent member of the Kerala school, was his son and also his pupil. Parameshvara was also a teacher of Nilakantha Somayaji (1444–1544) the author of the celebrated Tantrasamgraha.
Parameshvara wrote commentaries on many mathematical and astronomical works such as those by Bhāskara I and Aryabhata. He made a series of eclipse observations over a 55-year period. Constantly attempted to compare these with the theoretically computed positions of the planets. He revised planetary parameters based on his observations.
One of Parameshvara's more significant contributions was his mean value type formula for the inverse interpolation of the sine.[2]
He was the first mathematician to give a formula for the radius of the circle circumscribing a cyclic quadrilateral.[3] The expression is sometimes attributed to Lhuilier [1782], 350 years later. With the sides of the cyclic quadrilateral being a, b, c, and d, the radius R of the circumscribed circle is:
R=\sqrt{
| (ab+cd)(ac+bd)(ad+bc) | |
| (-a+b+c+d)(a-b+c+d)(a+b-c+d)(a+b+c-d) |
The following works of Parameshvara are well-known.[4] A complete list of all manuscripts attributed to Parameshvara is available in Pingree.[1]